Business Logic Reasoning & Argument PDF

Summary

This document discusses different types of reasoning, including deductive and inductive reasoning. It covers the concepts of premises and conclusions, and how to evaluate arguments based on their validity and soundness.

Full Transcript

Reasoning & Argument What is Reasoning? Reasoning is the process of thinking about something in a logical way in order to form a conclusion or judgment. It involves the ability to analyze information, understand relationships between ideas, and make decisions based on...

Reasoning & Argument What is Reasoning? Reasoning is the process of thinking about something in a logical way in order to form a conclusion or judgment. It involves the ability to analyze information, understand relationships between ideas, and make decisions based on evidence. Types of Reasoning 1. Deductive Reasoning: Definition: This is a logical process where a conclusion is based on the concordance of multiple premises that are generally assumed to be true. Example: Premise 1: All humans are mortal. Premise 2: Socrates is a human. Conclusion: Therefore, Socrates is mortal. What is Premise in Tagalog? Palagay refers to an assumption or a belief that serves as the foundation for an argument. Batayan refers to the basis or foundation of an argument, often emphasizing the evidence or reasons supporting a conclusion. What is Conclusion in Tagalog? Konklusyon: It refers to the final decision or judgment reached after considering the premises or evidence in an argument. If you need further clarification or examples, feel free to ask! The conclusion logically follows from the premises. If both premises are true, then the conclusion must also be true. Example 2 1. Premise 1: All mammals are warm-blooded. 2. Premise 2: A dolphin is a mammal. 3. Conclusion: Therefore, a dolphin is warm-blooded. Explanation Premise 1 provides a general statement about all mammals. Premise 2 identifies dolphins as part of that category. The conclusion logically follows from the premises. If both premises are true, then the conclusion must also be true. Types of Reasoning 2. Inductive Reasoning: Definition: This is a reasoning process where conclusions are drawn from specific observations to general principles. Example: Observation: The sun has risen in the east every day in recorded history. Conclusion: The sun will rise in the east tomorrow. Key Point: The conclusion is probable but not guaranteed; it’s based on patterns. Example 2 1. Observation: Every time I water my plants, they grow taller. 2. Observation: My neighbor’s plants also grew taller when he watered them. 3. Observation: All the plants I’ve seen in the garden grow taller when watered. Conclusion Conclusion: Therefore, watering plants likely causes them to grow taller. Explanation In this example: The conclusion is drawn from specific observations about how plants react to being watered. Although the conclusion seems reasonable based on the evidence, it’s not guaranteed; other factors could influence plant growth. What is an Argument? An argument is a set of statements where some statements (premises) are offered to support another statement (conclusion). Arguments are used to persuade others or to present a case for or against something. What is an Argument? (Tagalog) Argumento is commonly used in academic or formal contexts to refer to a reasoned discussion or debate. Tatalo can refer to a dispute or a clash of ideas, often used in more informal settings. Structure of an Argument 1. Premises: The reasons or evidence that support the conclusion. 2. Conclusion: The statement that the premises are intended to support. Premises: “Mga palagay” or “mga batayan.” Conclusion: “Konklusyon.” So, you can refer to “premises” as the assumptions or basis for an argument, and “conclusion” as the final decision or judgment reached from those premises. Example of an Argument Batayan/Premise 1: Regular exercise improves overall health. Batayan/Premise 2: A healthy lifestyle reduces the risk of chronic diseases. Conclusion: Therefore, regular exercise can help reduce the risk of chronic diseases. Evaluating Arguments When evaluating an argument, consider: 1. Validity: Is the argument logically structured? Does the conclusion logically follow from the premises? 2. Soundness: Are the premises true? If they are true and the argument is valid, then the conclusion must be true. 3. Strength: In inductive arguments, how strong is the evidence supporting the conclusion? Is it convincing? Evaluating Arguments Halimbawa ng Pagsusuri ng Argumento Argumento: 1. Premise/Palagay/Batayan 1: Ang regular na ehersisyo ay nakakapagpabuti ng kalusugan. 2. Premise/Palagay/Batayan 2: Si Juan ay nag-eehersisyo ng tatlong beses sa isang linggo. 3. Konklusyon: Samakatuwid, si Juan ay mas malusog kaysa sa mga hindi nag-eehersisyo. Reasoning Reasoning is the cognitive process of drawing conclusions, making inferences, or formulating beliefs based on information and logical principles. It involves analyzing information, connecting ideas, and evaluating evidence to arrive at a reasoned judgment or conclusion. Reasoning (Tagalog) Ang pangangatwiran ay ang proseso ng pag-iisip na naglalayong bumuo ng mga konklusyon, gumawa ng mga inferensya, o bumuo ng mga paniniwala batay sa impormasyon at lohikal na mga prinsipyo. Ito ay kinabibilangan ng pagsusuri ng impormasyon, pag-unawa sa mga ugnayan ng mga ideya, at pagtukoy sa ebidensya upang makabuo ng makatuwirang paghuhusga o konklusyon. Why is Reasoning Important? Reasoning helps us make informed decisions, solve problems, and understand complex issues. It enables critical thinking, which is crucial in our everyday lives, from academic settings to personal decision-making. Why is Reasoning Important? Reasoning helps us make informed decisions, solve problems, and understand complex issues. It enables critical thinking, which is crucial in our everyday lives, from academic settings to personal decision-making. Conclusion To sum up, reasoning and argument are essential skills that enable us to communicate effectively and persuade others. By understanding the types of reasoning and how to construct and evaluate arguments, we become better thinkers and communicators. Why is Reasoning Important? (Tagalog) Sa kabuuan, ang pangangatwiran ay mahalaga dahil ito ay nagpapalakas ng ating kakayahan na mag-isip nang lohikal, gumawa ng tamang desisyon, at makipag-ugnayan nang mas epektibo. Ito ay isang mahalagang kasangkapan na nagbibigay-daan sa atin upang maging mas mapanuri at responsableng mga indibidwal. Composition of Reasoning Reasoning can be composed of several elements: 1. Premises: These are statements or propositions that provide the basis or evidence for the conclusion. Premises can be factual or assumed. 2. Conclusion: This is the statement that the premises are intended to support. It is the outcome of the reasoning process. 3. Logical Connectives: These are words or phrases that help connect premises to the conclusion, such as “therefore,” “thus,” “since,” and “because.” 4. Assumptions: These are unstated premises that underlie the reasoning. They may be necessary for the argument to hold but are not explicitly stated. 5. Inference: This is the mental process of deriving logical conclusions from premises. It is how we move from the premises to the conclusion. Composition of Reasoning (Tagalog) Ang pangangatwiran ay binubuo ng ilang mga elemento: 1. Mga Palagay (Premises): Ito ang mga pahayag o proposisyon na nagbibigay ng batayan o ebidensya para sa konklusyon. Ang mga palagay ay maaaring totoo o inaasahan. 2. Konklusyon (Conclusion): Ito ang pahayag na sinisikap ng mga palagay na suportahan. Ito ang kinalabasan ng proseso ng pangangatwiran. 3. Mga Lohikal na Konektibo (Logical Connectives): Ito ang mga salita o parirala na tumutulong na ikonekta ang mga palagay sa konklusyon, tulad ng “kaya,” “samakatuwid,” “dahil,” at “sapagkat.” 4. Mga Assumption (Assumptions): Ito ang mga hindi nakasaad na palagay na nakatago sa likod ng pangangatwiran. Maaaring kailanganin ang mga ito para maging wasto ang argumento ngunit hindi tuwirang nakasaad. 5. Inferensya (Inference): Ito ang mental na proseso ng pagkuha ng lohikal na konklusyon mula sa mga palagay. Ito ang paraan kung paano tayo lumilipat mula sa mga palagay patungo sa konklusyon. Types of Reasoning 1. Deductive Reasoning 2. Inductive Reasoning 3. Abductive Reasoning 4. Analogical Reasoning Types of Reasoning 1. Deductive Reasoning: Description: This type of reasoning starts with general premises and derives specific conclusions. It is a top-down approach. Characteristics: If the premises are true, the conclusion must also be true. Used in formal logic and mathematics. Example: Premise 1: All birds have feathers. Premise 2: A sparrow is a bird. Conclusion: Therefore, a sparrow has feathers. Deductive Reasoning (Tagalog) 1. Tiyakin ang Konklusyon: Ang pangangatwirang deduktibo ay nag-aalok ng lohikal na koneksyon mula sa mga premisa patungo sa konklusyon. Kung ang mga premisa ay tama, ang konklusyon ay hindi maiiwasang tama. 2. Istraktura: Karaniwang gumagamit ng anyong syllogism ang deduktibong pangangatwiran, na binubuo ng dalawang premisa at isang konklusyon. Halimbawa: Premise 1: Lahat ng tao ay mamamatay. Premise 2: Si Socrates ay isang tao. Konklusyon: Samakatuwid, si Socrates ay mamamatay. 3. Gamit: Madalas itong ginagamit sa mga larangan ng matematika, siyensya, at pormal na lohika, kung saan ang mga patunay at teorya ay umaasa sa mga tiyak na prinsipyo. Types of Reasoning 2. Inductive Reasoning: Description: This type of reasoning starts with specific observations and builds up to a general conclusion. It is a bottom-up approach. Characteristics: The conclusion is probable but not guaranteed. Commonly used in scientific research and everyday decision-making. Example: Observation: Every swan I have seen is white. Conclusion: Therefore, all swans are probably white. Inductive Reasoning (Tagalog) Ang pangangatwirang induktibo ay isang uri ng pangangatwiran na nagsisimula sa mga tiyak na obserbasyon o halimbawa at naglalayong bumuo ng isang pangkalahatang konklusyon. Sa ganitong uri ng pangangatwiran, ang konklusyon ay maaaring totoo ngunit hindi ito tiyak. Sa halip, ang konklusyon ay nagiging mas malamang batay sa mga ebidensya o halimbawa. 1. Obserbasyon: Nakita kong ang lahat ng tao na nakilala ko ay may mga alagang aso. 2. Obserbasyon: Ang mga kaibigan ko ay may mga alagang aso. 3. Konklusyon: Samakatuwid, maaaring lahat ng tao ay may mga alagang aso. Types of Reasoning 3. Abductive Reasoning: Description: This reasoning involves starting with an incomplete set of observations and seeking the simplest and most likely explanation. It’s often used in hypothesis formation. Characteristics: It involves inferring the best possible explanation. Commonly used in fields like medicine and detective work. Example: Observation: The grass is wet. Conclusion: It probably rained (although it could be due to a sprinkler or other causes). Abductive Reasoning (Tagalog) Ang pangangatwirang abduktibo ay isang uri ng pangangatwiran na ginagamit upang bumuo ng mga pinaka- mahuhulaan o pinaka-makatuwirang paliwanag batay sa mga hindi kumpletong impormasyon o ebidensya. Sa ganitong uri ng pangangatwiran, nagsisimula tayo sa isang set ng mga obserbasyon at nagtatangkang makabuo ng isang konklusyon na maaaring maging pinakamahusay na paliwanag. Halimbawa ng Pangangatwirang Abduktibo: 1. Obserbasyon: Ang sahig ay basang-basa. 2. Obserbasyon: May mga bakas ng paa sa sahig. 3. Konklusyon: Maaaring umulan o may tao na naglakad dito na basa ang sapatos. Types of Reasoning 4. Analogical Reasoning: Description: This reasoning draws a comparison between two different things, suggesting that if they are alike in one way, they are alike in other ways as well. Characteristics: Often used in problem-solving and persuasion. Can be strong or weak depending on the relevance of the similarities. Example: If we can successfully use a certain strategy to solve problem A, we might use the same strategy for problem B because they are similar in key aspects. Types of Reasoning 4. Analogical Reasoning: Description: This reasoning draws a comparison between two different things, suggesting that if they are alike in one way, they are alike in other ways as well. Characteristics: Often used in problem-solving and persuasion. Can be strong or weak depending on the relevance of the similarities. Example: If we can successfully use a certain strategy to solve problem A, we might use the same strategy for problem B because they are similar in key aspects. Analogical Reasoning (Tagalog) Ang pangangatwirang analohikal ay isang uri ng pangangatwiran na gumagamit ng mga pagkakatulad sa pagitan ng dalawang magkaibang bagay o sitwasyon upang bumuo ng isang konklusyon o paliwanag. Sa ganitong uri ng pangangatwiran, ang ideya ay kung ang dalawang bagay ay may mga katangian na magkapareho, maaaring ang iba pang mga katangian nila ay magkakapareho rin. 1. Paghahambing: Ang utak ng tao ay katulad ng computer. 2. Konklusyon: Kung paano nagpoproseso ang computer ng impormasyon, gayundin ang utak ng tao ay nagpoproseso ng impormasyon. Conclusion Understanding the definition, composition, and types of reasoning helps enhance our critical thinking skills. It enables us to analyze arguments effectively, draw sound conclusions, and communicate our thoughts more clearly. Activity: Understanding Different Types of Reasoning Objective: To learn about deductive, inductive, and abductive reasoning, and practice identifying them in everyday situations. Instructions: Read each example and check the answer. The explanation is provided to help you understand why each example uses a particular type of reasoning. 1. You’ve seen three birds fly, and they all had feathers. You think, “All birds must have feathers.” Type of Reasoning: Inductive Why: This is inductive reasoning because you’re making a general conclusion (all birds have feathers) based on observing a few examples (three birds). You’re making a generalization from specific cases. 2. You’re trying to figure out if a new smartphone will be a good purchase. Your friend has a phone from the same brand, and they’re very happy with it. You think, “If my friend’s phone from this brand works well, my new phone from the same brand will work well too.” Type of Reasoning: Analogical Why: This is analogical reasoning because you are drawing a conclusion based on the comparison of two similar things (your friend’s phone and the new phone). You’re assuming that because one phone from the brand works well, another similar product from the same brand will also perform well. 3. All apples are fruits. A Granny Smith is an apple. So, a Granny Smith must be a fruit. Type of Reasoning: Deductive Why: This is deductive reasoning because the conclusion (Granny Smith is a fruit) follows logically from the general statement (all apples are fruits). You’re moving from a general rule to a specific example. 4. You come home and see muddy footprints on the floor and an open door. You think, “Someone must have come into the house.” Type of Reasoning: Abductive Why: This is abductive reasoning because you’re making the best guess based on incomplete evidence. You see clues (footprints and an open door) and infer the most likely explanation (someone came in). 5. A teacher explains that learning to play the piano is like learning to ride a bike. Both require practice, coordination, and repetition to improve. The student thinks, “Since I learned to ride a bike through practice, I’ll be able to learn the piano the same way.” Type of Reasoning: Analogical Why: This is analogical reasoning because the student is comparing two different activities (learning to ride a bike and learning to play the piano) and assuming that since they both require practice and repetition, the same method (practice) will lead to success in both. Thank You! Categorical Syllogism Categorical Syllogism- is a type of logical argument composed of three categorical propositions, which together lead to a conclusion. These propositions involve statements about categories or classes of things. Each syllogism consists of two premises and a conclusion that must logically follow from them. Ang Kategorikal na Siloismo ay isang uri ng lohikong argumento na binubuo ng tatlong kategorikal na proposisyon na magkakasamang humahantong sa isang konklusyon. Ang mga proposisyong ito ay naglalaman ng mga pahayag tungkol sa mga kategorya o uri ng mga bagay. Ang bawat siloismo ay binubuo ng dalawang premisa at isang konklusyon na dapat lohikal na sumunod mula sa mga ito. Ang Kategorikal na Siloismo ay isang uri ng lohikong argumento na binubuo ng tatlong kategorikal na proposisyon na magkakasamang humahantong sa isang konklusyon. Ang mga proposisyong ito ay naglalaman ng mga pahayag tungkol sa mga kategorya o uri ng mga bagay. Ang bawat siloismo ay binubuo ng dalawang premisa at isang konklusyon na dapat lohikal na sumunod mula sa mga ito. Structure of a Categorical Syllogism 1. Major premise: A general statement that includes the major term (predicate of the conclusion). 2. Minor premise: A more specific statement that includes the minor term (subject of the conclusion). 3. Conclusion: A statement that follows from the premises, linking the minor and major terms. The three terms in a categorical syllogism are: Major term: The predicate of the conclusion. Minor term: The subject of the conclusion. Middle term: A term that appears in both premises but not in the conclusion, and it connects the minor and major terms. Example of a Categorical Syllogism: Major premise: All humans are mortal. Minor premise: Socrates is a human. Conclusion: Therefore, Socrates is mortal. Here, the major term is “mortal,” the minor term is “Socrates,” and the middle term is “human.” Example of a Categorical Syllogism: Unang Premisa: Lahat ng tao ay may puso. Pangalawang Premisa: Si Ana ay tao. Konklusyon: Samakatuwid, si Ana ay may puso. Sa halimbawa na ito: Ang pangunahing termino (predicate) ay “may puso.” Ang pangalawang termino (subject) ay “Ana.” Ang gitnang termino ay “tao,” na nag-uugnay sa dalawang premisa. Unang Premisa: Lahat ng guro ay edukado. Pangalawang Premisa: Si G. Santos ay guro. Konklusyon: Samakatuwid, si G. Santos ay edukado. Sa halimbawa na ito: Ang pangunahing termino ay “edukado.” Ang pangalawang termino ay “G. Santos.” Ang gitnang termino ay “guro.” Ang konklusyon ay lohikal na nagmumula sa dalawang premisa, na nagpapakita na si G. Santos ay edukado dahil siya ay isang guro, at lahat ng guro ay edukado. Unang Premisa: Lahat ng guro ay edukado. Pangalawang Premisa: Si G. Santos ay guro. Konklusyon: Samakatuwid, si G. Santos ay edukado. Sa halimbawa na ito: Ang pangunahing termino ay “edukado.” Ang pangalawang termino ay “G. Santos.” Ang gitnang termino ay “guro.” Ang konklusyon ay lohikal na nagmumula sa dalawang premisa, na nagpapakita na si G. Santos ay edukado dahil siya ay isang guro, at lahat ng guro ay edukado. Standard Form of a Categorical Syllogism For a syllogism to be in standard form, it must meet these conditions: 1. It contains exactly three propositions: two premises and one conclusion. 2. Each proposition must be a categorical proposition, which can be one of four types: A (Universal Affirmative): All S are P. E (Universal Negative): No S are P. I (Particular Affirmative): Some S are P. O (Particular Negative): Some S are not P. 3. The terms must follow the proper order: the major premise comes first, the minor premise second, and the conclusion last. 4. There should be no more than three terms in total (major, minor, and middle). 3. The terms must follow the proper order: the major premise comes first, the minor premise second, and the conclusion last. 4. There should be no more than three terms in total (major, minor, and middle). Example in Standard Form: 1. Major premise (Universal Affirmative): All mammals are warm-blooded. 2. Minor premise (Particular Affirmative): All dogs are mammals. 3. Conclusion (Particular Affirmative): Therefore, all dogs are warm-blooded. This example shows a syllogism in its standard form, where: The major term is “warm-blooded.” The minor term is “dogs.” The middle term is “mammals.” Example in Standard Form: 1. Major premise (Universal Affirmative): All mammals are warm-blooded. 2. Minor premise (Particular Affirmative): All dogs are mammals. 3. Conclusion (Particular Affirmative): Therefore, all dogs are warm-blooded. This example shows a syllogism in its standard form, where: The major term is “warm-blooded.” The minor term is “dogs.” The middle term is “mammals.” Unang Premisa (Universal Affirmative): Lahat ng estudyante sa klase ay pumasa sa pagsusulit. Pangalawang Premisa (Particular Affirmative): Si Cyrene ay estudyante sa klase. Konklusyon (Particular Affirmative): Samakatuwid, si Cyrene ay pumasa sa pagsusulit. Sa halimbawa na ito: Ang pangunahing termino ay “pumasa sa pagsusulit.” Ang pangalawang termino ay “Cyrene.” Ang gitnang termino ay “estudyante sa klase.” Ang lohikal na konklusyon ay sumusunod sa mga premisa sa standard form, na nagpapakita na si Cyrene ay pumasa sa pagsusulit dahil siya ay estudyante sa klase, at lahat ng estudyante sa klase ay pumasa. Evaluating Categorical Syllogisms Not all syllogisms are valid. A syllogism is valid if the conclusion follows logically from the premises. Some common rules for validity include: The middle term must be distributed (i.e., apply to all members of the category) in at least one premise. If a term is distributed in the conclusion, it must also be distributed in the premise. A negative premise must have a negative conclusion, and an affirmative premise must have an affirmative conclusion. Evaluating Categorical Syllogisms Not all syllogisms are valid. A syllogism is valid if the conclusion follows logically from the premises. Some common rules for validity include: The middle term must be distributed (i.e., apply to all members of the category) in at least one premise. If a term is distributed in the conclusion, it must also be distributed in the premise. A negative premise must have a negative conclusion, and an affirmative premise must have an affirmative conclusion. Final Thought In philosophy and logic, categorical syllogisms are foundational tools for constructing clear, logical arguments. They allow us to move from broad statements to specific conclusions, provided the reasoning is sound. When analyzing syllogisms, always ensure they are in standard form and follow the rules of validity to avoid faulty conclusions. What is a Categorical Syllogism? A categorical syllogism is a type of logical argument that consists of three statements: 1. Two premises (the major and minor premises). 2. One conclusion. Each of these statements is a categorical proposition, meaning they state a relationship between two categories or groups. For example: “All humans are mortal” (major premise) “Socrates is a human” (minor premise) “Therefore, Socrates is mortal” (conclusion) What Do We Mean by “Mood”? The mood of a categorical syllogism refers to the specific combination of the types of propositions (A, E, I, O) used in the syllogism. Each proposition can be one of these four types: What Do We Mean by “Mood”? A: Universal Affirmative (e.g., All humans are mortal) E: Universal Negative (e.g., No dogs are cats) I: Particular Affirmative (e.g., Some students are tired) O: Particular Negative (e.g., Some cars are not electric) What Do We Mean by “Mood”? So, the mood is a shorthand way to describe what types of propositions make up the syllogism. A mood will be written as a sequence of three letters, each representing one proposition: the major premise, minor premise, and conclusion. For example, AAA would be a mood where all three statements (major premise, minor premise, and conclusion) are universal affirmatives. Examples of Moods: 1. AAA Mood: Major Premise: All birds are animals (A) Minor Premise: All robins are birds (A) Conclusion: All robins are animals (A) Examples of Moods: 2. EAE Mood: Major Premise: No fish are mammals (E) Minor Premise: All dolphins are fish (A) Conclusion: No dolphins are mammals (E) Examples of Moods: 3. AOO Mood: Major Premise: All birds are animals (A) Minor Premise: Some animals are not mammals (O) Conclusion: Some birds are not mammals (O) Recap of the Structure: A categorical syllogism is structured like this: 1. Major Premise (general statement about a larger group) 2. Minor Premise (specific statement about a smaller group) 3. Conclusion (derived from the two premises) Each of these is a categorical proposition (A, E, I, O), which defines whether it’s about “all,” “none,” “some,” or “some…not.” Key Points to Remember: 1. The mood of a categorical syllogism describes the types of categorical propositions used. 2. A, E, I, O stand for: A: Universal Affirmative (All X are Y) E: Universal Negative (No X are Y) I: Particular Affirmative (Some X are Y) O: Particular Negative (Some X are not Y) In summary: The mood represents the types of propositions used in a categorical syllogism. It helps us quickly see the logical structure of the argument without diving into the details of the content. Think of the mood as the “DNA” of the syllogism— it tells you the form of the argument. Rules in Categorical Syllogism Rules in Categorical Syllogism A categorical syllogism is a form of deductive reasoning consisting of three categorical propositions: two premises and a conclusion. Each of these propositions contains three terms: 1. Major Term (P): The predicate of the conclusion. 2. Minor Term (S): The subject of the conclusion. 3. Middle Term (M): The term that appears in both premises but not in the conclusion. The structure of a categorical syllogism looks like this: Major Premise: All M are P. Minor Premise: All S are M. Conclusion: Therefore, all S are P. Rules of Categorical Syllogism For a categorical syllogism to be valid, it must adhere to six key rules. If any of these rules are broken, the syllogism is invalid: 1. The syllogism must contain exactly three terms. These three terms are the major term, minor term, and middle term. No term should be used ambiguously or change meaning throughout the syllogism. Violation: If a term is used inconsistently (equivocation), or if there are more than three terms. Rule 1: 1. The syllogism must contain exactly three terms. Let’s explore Rule 1: The syllogism must contain exactly three terms with an example that violates this rule and one that follows it. Violation: This syllogism contains four terms: 1. Dogs (subject in the conclusion). 2. Animals (predicate in the major premise). 3. Cats (subject in the minor premise). 4. Mammals (predicate in the minor premise). Additionally, the conclusion introduces a fifth idea, “friendly,” which wasn’t in either premise. This makes the syllogism invalid because there is no logical connection between all the terms. Example of a Syllogism that Violates the Rule: Major Premise: All dogs are animals. Minor Premise: All cats are mammals. Conclusion: Therefore, all dogs are friendly. Violation: This syllogism contains four terms: 1. Dogs (subject in the conclusion). 2. Animals (predicate in the major premise). 3. Cats (subject in the minor premise). 4. Mammals (predicate in the minor premise). Additionally, the conclusion introduces a fifth idea, “friendly,” which wasn’t in either premise. This makes the syllogism invalid because there is no logical connection between all the terms. Example of a Syllogism that Follows the Rule: Major Premise: All dogs are animals. Minor Premise: All poodles are dogs. Conclusion: Therefore, all poodles are animals. Correct Use: This syllogism contains exactly three terms: 1. Dogs (middle term, appears in both premises but not the conclusion). 2. Animals (major term, appears in the major premise and conclusion). 3. Poodles (minor term, appears in the minor premise and conclusion). This syllogism follows the rule because the terms are consistent and clearly linked throughout the argument. 2. The middle term must be distributed at least once. The middle term acts as the link between the major and minor terms. It must apply to all members of the category in at least one premise to establish a connection. Violation: If the middle term is never distributed (i.e., never refers to all members of its category), the premises do not connect the major and minor terms. Let’s explore Rule 2: The middle term must be distributed at least once with an easy example that violates this rule and one that follows it. Example of a Syllogism that Violates the Rule: Major Premise: All dogs are animals. Minor Premise: All cats are animals. Conclusion: Therefore, all cats are dogs. Violation: The middle term here is “animals” (the term that appears in both premises). However, “animals” is not distributed in either premise. It doesn’t apply to all animals, only to some (those that are dogs and those that are cats). In the first premise, “All dogs are animals” refers to some animals (those that are dogs). In the second premise, “All cats are animals” refers to some animals (those that are cats). Since “animals” is never talking about all animals, the premises do not establish a strong enough link between “cats” and “dogs.” The conclusion is invalid. Example of a Syllogism that Follows the Rule: Major Premise: All dogs are mammals. Minor Premise: All poodles are dogs. Conclusion: Therefore, all poodles are mammals. Correct Use: The middle term here is “dogs.” It is distributed in the second premise, “All poodles are dogs,” because it applies to all poodles. This creates a valid connection between the minor term (“poodles”) and the major term (“mammals”). Since “dogs” is distributed, the conclusion logically follows, and the syllogism is valid. 3. If a term is distributed in the conclusion, it must be distributed in the premises. A distributed term in the conclusion refers to all members of its category. If this distribution doesn’t occur in the premises, there’s insufficient support for such a conclusion. Violation: If the conclusion makes a broader claim about a term than the premises warrant, the syllogism commits the fallacy of illicit process. Example of a Syllogism that Violates the Rule: Major Premise: All cats are animals. Minor Premise: Some pets are cats. Conclusion: Therefore, all pets are animals. Violation: In the conclusion, the term “pets” is distributed (referring to all pets). However, in the minor premise, “pets” is not distributed because it only refers to “some pets.” This violates the rule because the conclusion makes a claim about all pets, but the premises only support a claim about some pets. Therefore, the syllogism is invalid. Example of a Syllogism that Follows the Rule: Major Premise: All cats are animals. Minor Premise: All Siamese are cats. Conclusion: Therefore, all Siamese are animals. Correct Use: In this case, the conclusion says “all Siamese are animals.” The term “Siamese” is distributed (referring to all Siamese) in the conclusion, and it is also distributed in the minor premise (“All Siamese are cats”). Because the term that is distributed in the conclusion is also distributed in the premises, this syllogism follows the rule and is valid. 4. No syllogism can have two negative premises. Negative premises deny something, and two such premises cannot affirm anything in the conclusion. Violation: Having two negative premises results in no connection between the major and minor terms, leading to an invalid syllogism. Let’s explore Rule 4: No syllogism can have two negative premises with an example that violates this rule and one that follows it. Example of a Syllogism that Violates the Rule: Major Premise: No dogs are cats. Minor Premise: No birds are dogs. Conclusion: Therefore, no birds are cats. Violation: Both premises are negative: The major premise says “No dogs are cats” (negative). The minor premise says “No birds are dogs” (negative). When both premises are negative, there is no overlap or connection between the terms, so you cannot draw any conclusion. The lack of connection between birds and cats makes the conclusion invalid. Example of a Syllogism that Follows the Rule: Major Premise: No dogs are cats. Minor Premise: All poodles are dogs. Conclusion: Therefore, no poodles are cats. Correct Use: Here, only the major premise is negative (“No dogs are cats”). The minor premise is affirmative (“All poodles are dogs”). This creates a connection between the terms, and the conclusion (“No poodles are cats”) logically follows. Since there is only one negative premise, the syllogism follows the rule and is valid. 5. If one premise is negative, the conclusion must be negative. A negative premise (either “no” or “some… not”) means the terms are not fully connected, so the conclusion must reflect that lack of connection by also being negative. Violation: If the conclusion is affirmative despite a negative premise, it implies a connection where none has been established. Let’s explore Rule 5: If one premise is negative, the conclusion must be negative with an example that violates this rule and one that follows it. Example of a Syllogism that Violates the Rule: Major Premise: No fish are mammals. Minor Premise: All dolphins are mammals. Conclusion: Therefore, all dolphins are fish. Violation: The major premise is negative (“No fish are mammals”), but the conclusion is affirmative (“All dolphins are fish”). This violates the rule because a negative premise suggests that there is some kind of exclusion or lack of connection between terms, so the conclusion should also reflect that exclusion. However, this conclusion falsely asserts a positive connection between dolphins and fish, making the syllogism invalid. Example of a Syllogism that Follows the Rule: Major Premise: No reptiles are mammals. Minor Premise: All snakes are reptiles. Conclusion: Therefore, no snakes are mammals. Correct Use: In this case, the major premise is negative (“No reptiles are mammals”), and the conclusion is also negative (“No snakes are mammals”). Since the conclusion reflects the exclusion set up by the negative premise, the syllogism follows the rule and is valid. 6. No syllogism can have a particular conclusion if both premises are universal. Universal premises make broad claims about all members of a category, while particular conclusions make claims about some members. If the premises discuss all members, the conclusion cannot suddenly limit itself to just some. Violation: If both premises are universal and the conclusion is particular, the argument jumps from a broad scope to a narrower one without justification. Example of a Valid Syllogism Major Premise: All mammals are warm-blooded animals. Minor Premise: All cats are mammals. Conclusion: Therefore, all cats are warm-blooded animals. This syllogism is valid because: 1. There are exactly three terms (mammals, warm- blooded animals, cats). 2. The middle term (“mammals”) is distributed in the major premise. 3. The terms distributed in the conclusion are properly distributed in the premises. 4. Neither premise is negative. 5. The conclusion is not negative, which aligns with the premises being affirmative. 6. Both premises are universal, and so is the conclusion. Let’s explore Rule 6: No syllogism can have a particular conclusion if both premises are universal with an example that violates this rule and one that follows it. Example of a Syllogism that Violates the Rule: Major Premise: All mammals are animals. Minor Premise: All dogs are mammals. Conclusion: Therefore, some dogs are animals. Violation: Both the major premise (“All mammals are animals”) and the minor premise (“All dogs are mammals”) are universal because they refer to all members of their categories. However, the conclusion (“Some dogs are animals”) is particular, referring to only some members of the category “dogs.” This violates the rule because a particular conclusion (referring to “some”) cannot follow from two universal premises (which refer to “all”). The premises talk about all mammals and all dogs, so the conclusion must also be universal. Example of a Syllogism that Follows the Rule: Major Premise: All birds are animals. Minor Premise: All parrots are birds. Conclusion: Therefore, all parrots are animals. Correct Use: Both premises are universal: Major premise: “All birds are animals.” Minor premise: “All parrots are birds.” The conclusion (“All parrots are animals”) is also universal, referring to all parrots. Since the conclusion remains universal, it follows the rule and is valid. Summary These six rules ensure that the terms in the syllogism are correctly linked, the scope of the premises matches the conclusion, and no invalid inferences are drawn. Venn Diagrams and Categorical Syllogisms 1. Categorical Syllogisms: A categorical syllogism is a form of deductive reasoning that uses two premises to draw a conclusion. Each statement in the syllogism relates two categories or sets, and the structure typically follows this form: Major premise: All A are B. Minor premise: All B are C. Conclusion: Therefore, all A are C. The idea is that you connect the relationship between the categories (or sets) to draw a valid conclusion. Example: Major premise: All dogs are animals. Minor premise: All animals are living things. Conclusion: Therefore, all dogs are living things. 2. Venn Diagrams: Venn diagrams help visualize the relationships between different sets (categories) by using overlapping circles. In the context of categorical syllogisms, each circle represents a category or a set, and the overlaps represent elements that belong to multiple categories. Let’s use a Venn diagram to represent the syllogism example: A = “Dogs” B = “Animals” C = “Living things” How to Draw the Venn Diagram: 1. Step 1: Draw three overlapping circles. Circle 1 represents A (Dogs), Circle 2 represents B (Animals), Circle 3 represents C (Living Things). How to Draw the Venn Diagram: 2. Step 2: Apply the major premise “All dogs are animals.” Shade the part of the A (Dogs) circle that doesn’t overlap with B (Animals), since dogs can’t exist outside the set of animals. How to Draw the Venn Diagram: 3. Step 3: Apply the minor premise “All animals are living things.” Shade the part of the B (Animals) circle that doesn’t overlap with C (Living Things), indicating that all animals must also be living things. How to Draw the Venn Diagram: 4. Step 4: Conclusion check: “All dogs are living things.” After applying the premises, the diagram should show that the part of A (Dogs) is fully within the overlap between B (Animals) and C (Living Things). This confirms that all dogs are, indeed, living things. This is what the structure of the Venn diagram looks like: A is fully within B, B is fully within C, Thus, A is fully within C. How to Draw the Venn Diagram: The circle for “Dogs” is fully within the “Animals” circle, and the “Animals” circle is fully within the “Living Things” circle, confirming that all dogs are animals and all animals are living things. 3. Evaluating Validity: You can use Venn diagrams to evaluate the validity of a syllogism. If the conclusion follows from the premises, the Venn diagram will reflect that relationship. If the conclusion does not follow from the premises, the Venn diagram will show inconsistencies (like parts of one set that aren’t included where they should be). Example of an Invalid Syllogism: Major premise: Some animals are mammals. Minor premise: Some mammals are dogs. Conclusion: Therefore, some animals are dogs. Let’s visualize this with a Venn diagram. You’ll see that while some mammals may overlap with dogs, not all animals necessarily do. The conclusion doesn’t follow logically, making the syllogism invalid. Summary: Categorical syllogisms involve logical reasoning based on categories (sets) and their relationships. Venn diagrams help us visualize these relationships and check whether the syllogism is valid. You draw circles for each category, apply shading to represent the premises, and see if the conclusion matches the overlaps shown in the diagram.

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